The coefficient of `x^(-n)"in" (1 + x)^(n).(1 + (1)/(x))` is

The coefficient of x^(n) in ((1+x)^(2))/((1-x)^(3)) is

The coefficient of x^(p)" in"(1+x)^(p)+(1+x)^(p+1)+…+(1+x)^(n), p lt n , is

If the coefficient of x^(n) in (x+1)/((x-1)^(2)(x-2)) is K-2n-(3)/(2^(n+1)), then K=

Statement-1: The middle term of (x+(1)/(x))^(2n) can exceed ((2n)^(n))/(n!) for some value of x. Statement-2: The coefficient of x^(n) in the expansion of (1-2x+3x^(2)-4x^(3)+ . . .)^(-n) is (1*3*5 . . .(2n-1))/(n!)*2^(n) . Statement-3: The coefficient of x^(5) in (1+2x+3x^(2)+ . . .)^(-3//2) is 2.1.

The coefficient of x^(n) in the expansion of (1+x)(1-x)^(n) is

If n is a positive integer,find the coefficient of x^(-1) in the expansion of (1+x)^(n)(1+(1)/(x))^(n)

The coefficient of x^(n) in (1-(x)/(1!)+(x^(2))/(2!)-(x^(3))/(3!)+...+((-1)^(n)x^(n))/(n!))^(2) is equal to

The coefficient of x^(n) in the expansion of ((1 + x)/(1-x))^(2), is